Your search keyword '"Yui Noma"' showing total 6 results

1. Inverse Stereographic Projecting Hashing for Fast Similarity Search

Author

Yui Noma

Subjects

General Computer Science, Computer science, business.industry, Nearest neighbor search, Hash function, Stereographic projection, Inverse, Pattern recognition, 02 engineering and technology, Hypersphere, 020204 information systems, 0202 electrical engineering, electronic engineering, information engineering, 020201 artificial intelligence & image processing, Binary code, Artificial intelligence, business

Published

2017

2. Extended 5d Seiberg–Witten theory and melting crystal

Author

Kanehisa Takasaki, Yui Noma, and Toshio Nakatsu

Subjects

High Energy Physics - Theory, Physics, Coupling constant, Nuclear and High Energy Physics, Partition function (quantum field theory), Nonlinear Sciences - Exactly Solvable and Integrable Systems, FOS: Physical sciences, Mathematical Physics (math-ph), Function (mathematics), High Energy Physics::Theory, High Energy Physics - Theory (hep-th), Correlation function, Quantum mechanics, Mathematics - Quantum Algebra, Thermodynamic limit, Loop space, FOS: Mathematics, Quantum Algebra (math.QA), Exactly Solvable and Integrable Systems (nlin.SI), Mathematical Physics, Seiberg–Witten theory, Mathematical physics, Generating function (physics)

Abstract

We study an extension of the Seiberg-Witten theory of $5d$ $\mathcal{N}=1$ supersymmetric Yang-Mills on $\mathbb{R}^4 \times S^1$. We investigate correlation functions among loop operators. These are the operators analogous to the Wilson loops encircling the fifth-dimensional circle and give rise to physical observables of topological-twisted $5d$ $\mathcal{N}=1$ supersymmetric Yang-Mills in the $\Omega$ background. The correlation functions are computed by using the localization technique. Generating function of the correlation functions of U(1) theory is expressed as a statistical sum over partitions and reproduces the partition function of the melting crystal model with external potentials. The generating function becomes a $\tau$ function of 1-Toda hierarchy, where the coupling constants of the loop operators are interpreted as time variables of 1-Toda hierarchy. The thermodynamic limit of the partition function of this model is studied. We solve a Riemann-Hilbert problem that determines the limit shape of the main diagonal slice of random plane partitions in the presence of external potentials, and identify a relevant complex curve and the associated Seiberg-Witten differential., Comment: Final version to be published in Nucl. Phys. B. Typos are corrected. 38 pages, 4 figures

Published

2009

3. Markov Chain Monte Carlo for Arrangement of Hyperplanes in Locality-Sensitive Hashing

Author

Yui Noma and Makiko Konoshima

Subjects

FOS: Computer and information sciences, General Computer Science, Computer science, business.industry, Feature vector, Supervised learning, Pattern recognition, Hamming distance, Markov chain Monte Carlo, Locality-sensitive hashing, Machine Learning (cs.LG), Computer Science - Learning, symbols.namesake, Hyperplane, Feature (machine learning), symbols, Artificial intelligence, business, Hamming code

Abstract

Since Hamming distances can be calculated by bitwise computations, they can be calculated with less computational load than L2 distances. Similarity searches can therefore be performed faster in Hamming distance space. The elements of Hamming distance space are bit strings. On the other hand, the arrangement of hyperplanes induce the transformation from the feature vectors into feature bit strings. This transformation method is a type of locality-sensitive hashing that has been attracting attention as a way of performing approximate similarity searches at high speed. Supervised learning of hyperplane arrangements allows us to obtain a method that transforms them into feature bit strings reflecting the information of labels applied to higher-dimensional feature vectors. In this p aper, we propose a supervised learning method for hyperplane arrangements in feature space that uses a Markov chain Monte Carlo (MCMC) method. We consider the probability density functions used during learning, and evaluate their performance. We also consider the sampling method for learning data pairs needed in learning, and we evaluate its performance. We confirm that the accuracy of this learning method when using a suitable probability density function and sampling method is greater than the accuracy of existing learning methods., Comment: 13 pages, 10 figures

Published

2013

4. Integrable Structure of $5d$ $\mathcal{N}=1$ Supersymmetric Yang-Mills and Melting Crystal

Author

Yui Noma, Toshio Nakatsu, and Kanehisa Takasaki

Subjects

High Energy Physics - Theory, Physics, Nuclear and High Energy Physics, Integrable system, FOS: Physical sciences, Astronomy and Astrophysics, Yang–Mills existence and mass gap, Supersymmetry, Partition function (mathematics), Atomic and Molecular Physics, and Optics, Crystal, Loop (topology), High Energy Physics - Theory (hep-th), Crystal model, Condensed Matter::Superconductivity, Generating function (physics), Mathematical physics

Abstract

We study loop operators of $5d$ $\mathcal{N}=1$ SYM in $\Omega$ background. For the case of U(1) theory, the generating function of correlation functions of the loop operators reproduces the partition function of melting crystal model with external potential. We argue the common integrable structure of $5d$ $\mathcal{N}=1$ SYM and melting crystal model., Comment: 12 pages, 1 figure, based on an invited talk presented at the international workshop "Progress of String Theory and Quantum Field Theory" (Osaka City University, December 7-10, 2007), to be published in the proceedings

Published

2008

5. Supersymmetric Gauge Theories with Matters, Toric Geometries and Random Partitions

Author

Yui Noma

Subjects

Physics, High Energy Physics - Theory, Partition function (quantum field theory), Physics and Astronomy (miscellaneous), Generalization, Hilbert space, FOS: Physical sciences, symbols.namesake, Quantization (physics), Theoretical physics, Polyhedron, High Energy Physics - Theory (hep-th), Correlation function, symbols, Gauge theory, Boson

Abstract

We derive the relation between the Hilbert space of certain geometries under the Bohr-Sommerfeld quantization and the perturbative prepotentials for the supersymmetric five-dimensional SU(N) gauge theories with massive fundamental matters and with one massive adjoint matter. The gauge theory with one adjoint matter shows interesting features. A five-dimensional generalization of Nekrasov's partition function can be written as a correlation function of two-dimensional chiral bosons and as a partition function of a statistical model of partitions. From a ground state of the statistical model we reproduce the polyhedron which characterizes the Hilbert space., 26 pages, 11 figures; v2 typos corrected

Published

2006

6. Gravitational Quantum Foam and Supersymmetric Gauge Theories

Author

Yui Noma, Takeshi Tamakoshi, Takashi Maeda, and Toshio Nakatsu

Subjects

Physics, Geometric quantization, High Energy Physics - Theory, Nuclear and High Energy Physics, Plane partition, FOS: Physical sciences, Supersymmetry, Mathematical Physics (math-ph), Gravitation, Singularity, High Energy Physics - Theory (hep-th), Quantum mechanics, Gauge theory, Quantum foam, Quantum, Mathematical Physics, Mathematical physics

Abstract

We study K\"{a}hler gravity on local SU(N) geometry and describe precise correspondence with certain supersymmetric gauge theories and random plane partitions. The local geometry is discretized, via the geometric quantization, to a foam of an infinite number of gravitational quanta. We count these quanta in a relative manner by measuring a deviation of the local geometry from a singular Calabi-Yau threefold, that is a A_{N-1} singularity fibred over \mathbb{P}^1. With such a regularization prescription, the number of the gravitational quanta becomes finite and turns to be the perturbative prepotential for five-dimensional \mathcal{N}=1 supersymmetric SU(N) Yang-Mills. These quanta are labelled by lattice points in a certain convex polyhedron on \mathbb{R}^3. The polyhedron becomes obtainable from a plane partition which is the ground state of a statistical model of random plane partition that describes the exact partition function for the gauge theory. Each gravitational quantum of the local geometry is shown to consist of N unit cubes of plane partitions., Comment: 43 pages, 12 figures: V2 typos corrected

Published

2005